The normal PG to a curve meets the x-axis in G. If the distance of G from the origin is twice the abscissa of P, prove that the curve is a rectangular hyperbola.

The normal to the curve at P(x, y) meets the x-axis at G. If the distance of G from the origin is twice the abscissa of P, then the curve is

The normal to a curve at P(x, y) meets the x-axis at G. If the distance of G from the origin is twice the abscissa of P, then the curve is a (1) ellipse (2) parabola (3) circle (4) hyperbola

The normal to a curve at P(x,y) meet the x- axis at G. If the distance of G from the origin is twic the abscissa of P, then the curve is a (a) parabola (b) circle (c) hyperbola (d) ellipse

In the curve y=ce^((x)/(a)), the sub-tangent is constant sub-normal varies as the square of the ordinate tangent at (x_(1),y_(1)) on the curve intersects the x-axis at a distance of (x_(1)-a) from the origin equation of the normal at the point where the curve cuts y-axis is cy+ax=c^(2)

If normal of the curve is parallel to x axis then

If the x-intercept of normal to a curve at P(x,y) is twice the abscissa of P then the equation of curve passing through M(2,4) is